Bernard Bolzano (, ; ; ; born Bernardus Placidus Johann Gonzal Nepomuk Bolzano; 5 October 1781 – 18 December 1848) was a

Bohemian Bohemian or Bohemians may refer to: *Anything of or relating to Bohemia Beer * National Bohemian, a brand brewed by Pabst * Bohemian, a brand of beer brewed by Molson Coors Culture and arts * Bohemianism, an unconventional lifestyle, origin ...

mathematician A mathematician is someone who uses an extensive knowledge of mathematics in their work, typically to solve mathematical problems. Mathematicians are concerned with numbers, data, quantity, structure, space, models, and change. History On ...

logician Logic is the study of correct reasoning. It includes both formal and informal logic. Formal logic is the science of deductively valid inferences or of logical truths. It is a formal science investigating how conclusions follow from premises ...

philosopher A philosopher is a person who practices or investigates philosophy. The term ''philosopher'' comes from the grc, φιλόσοφος, , translit=philosophos, meaning 'lover of wisdom'. The coining of the term has been attributed to the Greek th ...

theologian Theology is the systematic study of the nature of the divine and, more broadly, of religious belief. It is taught as an academic discipline, typically in universities and seminaries. It occupies itself with the unique content of analyzing the ...

and

Catholic priest The priesthood is the office of the ministers of religion, who have been commissioned (" ordained") with the Holy orders of the Catholic Church. Technically, bishops are a priestly order as well; however, in layman's terms ''priest'' refers onl ...

of Italian extraction, also known for his liberal views. Bolzano wrote in

German German(s) may refer to: * Germany (of or related to) **Germania (historical use) * Germans, citizens of Germany, people of German ancestry, or native speakers of the German language ** For citizens of Germany, see also German nationality law **Ge ...

, his native language. For the most part, his work came to prominence posthumously.

Family

Bolzano was the son of two pious

Catholics The Catholic Church, also known as the Roman Catholic Church, is the largest Christian church, with 1.3 billion baptized Catholics worldwide . It is among the world's oldest and largest international institutions, and has played a ...

. His father, Bernard Pompeius Bolzano, was an Italian who had moved to

Prague Prague ( ; cs, Praha ; german: Prag, ; la, Praga) is the capital and largest city in the Czech Republic, and the historical capital of Bohemia. On the Vltava river, Prague is home to about 1.3 million people. The city has a temperate ...

, where he married Maria Cecilia Maurer who came from Prague's German-speaking family Maurer. Only two of their twelve children lived to adulthood.

Career

Bolzano entered the University of Prague in 1796 and studied

mathematics Mathematics is an area of knowledge that includes the topics of numbers, formulas and related structures, shapes and the spaces in which they are contained, and quantities and their changes. These topics are represented in modern mathematics ...

philosophy Philosophy (from , ) is the systematized study of general and fundamental questions, such as those about existence, reason, knowledge, values, mind, and language. Such questions are often posed as problems to be studied or resolved. ...

and

physics Physics is the natural science that studies matter, its fundamental constituents, its motion and behavior through space and time, and the related entities of energy and force. "Physical science is that department of knowledge which ...

. In 1796 Bolzano enrolled in the Faculty of Philosophy at the University of Prague. During his studies he wrote: "My special predilection for Mathematics is based in a particular way on its speculative aspects, in other words, I greatly appreciate the part of Mathematics that is at the same time Philosophy." In the fall of 1800 he began to study theology. He devoted himself to this for the next three years, during which he also prepared his doctoral thesis in Geometry. He obtained his doctorate in 1804, after having written a thesis in which he expressed his opinion on Mathematics and on the characteristics of a correct mathematical demonstration. In the prologue he wrote: "I could not be satisfied with a strictly rigorous proof, if it were not derived from the concepts contained in the thesis to be proved." Starting in 1800, he also began studying

theology Theology is the systematic study of the nature of the divine and, more broadly, of religious belief. It is taught as an academic discipline, typically in universities and seminaries. It occupies itself with the unique content of analyzing th ...

, becoming a

Catholic The Catholic Church, also known as the Roman Catholic Church, is the largest Christian church, with 1.3 billion baptized Catholics worldwide . It is among the world's oldest and largest international institutions, and has played a ...

priest A priest is a religious leader authorized to perform the sacred rituals of a religion, especially as a mediatory agent between humans and one or more deities. They also have the authority or power to administer religious rites; in partic ...

in 1804. He was appointed to the new chair of

philosophy of religion Philosophy of religion is "the philosophical examination of the central themes and concepts involved in religious traditions". Philosophical discussions on such topics date from ancient times, and appear in the earliest known texts concerning p ...

at Prague University in 1805. He proved to be a popular lecturer not only in religion but also in philosophy, and he was elected Dean of the Philosophical Faculty in 1818. Bolzano alienated many faculty and church leaders with his teachings of the social waste of

militarism Militarism is the belief or the desire of a government or a people that a state should maintain a strong military capability and to use it aggressively to expand national interests and/or values. It may also imply the glorification of the mili ...

and the needlessness of war. He urged a total reform of the educational, social and economic systems that would direct the nation's interests toward peace rather than toward armed conflict between nations. His political convictions, which he was inclined to share with others with some frequency, eventually proved to be too liberal for the

Austrian Austrian may refer to: * Austrians, someone from Austria or of Austrian descent ** Someone who is considered an Austrian citizen, see Austrian nationality law * Austrian German dialect * Something associated with the country Austria, for example: ...

authorities. On December 24, 1819, he was removed from his professorship (upon his refusal to recant his beliefs) and was

exile Exile is primarily penal expulsion from one's native country, and secondarily expatriation or prolonged absence from one's homeland under either the compulsion of circumstance or the rigors of some high purpose. Usually persons and peoples suf ...

d to the

countryside In general, a rural area or a countryside is a geographic area that is located outside towns and cities. Typical rural areas have a low population density and small settlements. Agricultural areas and areas with forestry typically are desc ...

and then devoted his energies to his writings on social, religious, philosophical, and mathematical matters. Although forbidden to

publish Publishing is the activity of making information, literature, music, software and other content available to the public for sale or for free. Traditionally, the term refers to the creation and distribution of printed works, such as books, newsp ...

in mainstream journals as a condition of his exile, Bolzano continued to develop his ideas and publish them either on his own or in obscure

Eastern Europe Eastern Europe is a subregion of the European continent. As a largely ambiguous term, it has a wide range of geopolitical, geographical, ethnic, cultural, and socio-economic connotations. The vast majority of the region is covered by Russia, whi ...

an journals. In 1842 he moved back to Prague, where he died in 1848.

Mathematical work

Bolzano made several original contributions to mathematics. His overall philosophical stance was that, contrary to much of the prevailing mathematics of the era, it was better not to introduce intuitive ideas such as time and motion into mathematics. To this end, he was one of the earliest mathematicians to begin instilling

rigor Rigour (British English) or rigor (American English; see spelling differences) describes a condition of stiffness or strictness. These constraints may be environmentally imposed, such as "the rigours of famine"; logically imposed, such as ma ...

into

mathematical analysis Analysis is the branch of mathematics dealing with continuous functions, limits, and related theories, such as differentiation, integration, measure, infinite sequences, series, and analytic functions. These theories are usually studied ...

with his three chief mathematical works ''Beyträge zu einer begründeteren Darstellung der Mathematik'' (1810), ''Der binomische Lehrsatz'' (1816) and ''Rein analytischer Beweis'' (1817). These works presented "...a sample of a new way of developing analysis", whose ultimate goal would not be realized until some fifty years later when they came to the attention of

Karl Weierstrass Karl Theodor Wilhelm Weierstrass (german: link=no, Weierstraß ; 31 October 1815 – 19 February 1897) was a German mathematician often cited as the "father of modern analysis". Despite leaving university without a degree, he studied mathematics ...

. To the foundations of

he contributed the introduction of a fully rigorous ε–δ definition of a mathematical limit. Bolzano was the first to recognize the greatest lower bound property of the real numbers. Like several others of his day, he was skeptical of the possibility of

Gottfried Leibniz Gottfried Wilhelm (von) Leibniz . ( – 14 November 1716) was a German polymath active as a mathematician, philosopher, scientist and diplomat. He is one of the most prominent figures in both the history of philosophy and the history of mathem ...

infinitesimal In mathematics, an infinitesimal number is a quantity that is closer to zero than any standard real number, but that is not zero. The word ''infinitesimal'' comes from a 17th-century Modern Latin coinage ''infinitesimus'', which originally re ...

s, that had been the earliest putative foundation for

differential calculus In mathematics, differential calculus is a subfield of calculus that studies the rates at which quantities change. It is one of the two traditional divisions of calculus, the other being integral calculus—the study of the area beneath a curve ...

. Bolzano's notion of a limit was similar to the modern one: that a limit, rather than being a relation among infinitesimals, must instead be cast in terms of how the dependent variable approaches a definite quantity as the independent variable approaches some other definite quantity. Bolzano also gave the first purely

analytic Generally speaking, analytic (from el, ἀναλυτικός, ''analytikos'') refers to the "having the ability to analyze" or "division into elements or principles". Analytic or analytical can also have the following meanings: Chemistry * ...

proof of the

fundamental theorem of algebra The fundamental theorem of algebra, also known as d'Alembert's theorem, or the d'Alembert–Gauss theorem, states that every non- constant single-variable polynomial with complex coefficients has at least one complex root. This includes polynomia ...

, which had originally been proven by

Gauss Johann Carl Friedrich Gauss (; german: Gauß ; la, Carolus Fridericus Gauss; 30 April 177723 February 1855) was a German mathematician and physicist who made significant contributions to many fields in mathematics and science. Sometimes refer ...

from geometrical considerations. He also gave the first purely analytic proof of the

intermediate value theorem In mathematical analysis, the intermediate value theorem states that if f is a continuous function whose domain contains the interval , then it takes on any given value between f(a) and f(b) at some point within the interval. This has two impor ...

(also known as Bolzano's theorem). Today he is mostly remembered for the

Bolzano–Weierstrass theorem In mathematics, specifically in real analysis, the Bolzano–Weierstrass theorem, named after Bernard Bolzano and Karl Weierstrass, is a fundamental result about convergence in a finite-dimensional Euclidean space \R^n. The theorem states that each ...

, which

developed independently and published years after Bolzano's first proof and which was initially called the Weierstrass theorem until Bolzano's earlier work was rediscovered.

Philosophical work

Bolzano's posthumously published work '' Paradoxien des Unendlichen (The Paradoxes of the Infinite)'' (1851) was greatly admired by many of the eminent

s who came after him, including

Charles Sanders Peirce Charles Sanders Peirce ( ; September 10, 1839 – April 19, 1914) was an American philosopher, logician, mathematician and scientist who is sometimes known as "the father of pragmatism". Educated as a chemist and employed as a scientist for ...

Georg Cantor Georg Ferdinand Ludwig Philipp Cantor ( , ; – January 6, 1918) was a German mathematician. He played a pivotal role in the creation of set theory, which has become a fundamental theory in mathematics. Cantor established the importance o ...

, and

Richard Dedekind Julius Wilhelm Richard Dedekind (6 October 1831 – 12 February 1916) was a German mathematician who made important contributions to number theory, abstract algebra (particularly ring theory), and the axiomatic foundations of arithmetic. His ...

. Bolzano's main claim to fame, however, is his 1837 ''Wissenschaftslehre'' (''Theory of Science''), a work in four volumes that covered not only

philosophy of science Philosophy of science is a branch of philosophy concerned with the foundations, methods, and implications of science. The central questions of this study concern what qualifies as science, the reliability of scientific theories, and the ultim ...

in the modern sense but also logic,

epistemology Epistemology (; ), or the theory of knowledge, is the branch of philosophy concerned with knowledge. Epistemology is considered a major subfield of philosophy, along with other major subfields such as ethics, logic, and metaphysics. Epi ...

and scientific pedagogy. The logical theory that Bolzano developed in this work has come to be acknowledged as ground-breaking. Other works are a four-volume ''Lehrbuch der Religionswissenschaft'' (''Textbook of the Science of Religion'') and the metaphysical work ''Athanasia'', a defense of the immortality of the soul. Bolzano also did valuable work in mathematics, which remained virtually unknown until Otto Stolz rediscovered many of his lost journal articles and republished them in 1881.

''Wissenschaftslehre (Theory of Science)''

In his 1837 ''Wissenschaftslehre'' Bolzano attempted to provide logical foundations for all sciences, building on abstractions like part-relation,

abstract object In metaphysics, the distinction between abstract and concrete refers to a divide between two types of entities. Many philosophers hold that this difference has fundamental metaphysical significance. Examples of concrete objects include plants, h ...

s, attributes, sentence-shapes, ideas and propositions in themselves, sums and

set Set, The Set, SET or SETS may refer to: Science, technology, and mathematics Mathematics *Set (mathematics), a collection of elements *Category of sets, the category whose objects and morphisms are sets and total functions, respectively Electro ...

s, collections, substances, adherences, subjective ideas, judgments, and sentence-occurrences. These attempts were an extension of his earlier thoughts in the philosophy of mathematics, for example his 1810 ''Beiträge'' where he emphasized the distinction between the objective relationship between

logical consequence Logical consequence (also entailment) is a fundamental concept in logic, which describes the relationship between statements that hold true when one statement logically ''follows from'' one or more statements. A valid logical argument is on ...

s and our subjective recognition of these connections. For Bolzano, it was not enough that we merely have ''confirmation'' of natural or mathematical truths, but rather it was the proper role of the sciences (both pure and applied) to seek out ''justification'' in terms of the fundamental truths that may or may not appear to be obvious to our intuitions.

Introduction to ''Wissenschaftslehre''

Bolzano begins his work by explaining what he means by ''theory of science'', and the relation between our knowledge, truths and sciences. Human knowledge, he states, is made of all truths (or true propositions) that men know or have known. However, this is a very small fraction of all the truths that exist, although still too much for one human being to comprehend. Therefore, our knowledge is divided into more accessible parts. Such a collection of truths is what Bolzano calls a science (''Wissenschaft''). It is important to note that not all true propositions of a science have to be known to men; hence, this is how we can make discoveries in a science. To better understand and comprehend the truths of a science, men have created textbooks (''Lehrbuch''), which of course contain only the true propositions of the science known to men. But how to know where to divide our knowledge, that is, which truths belong together? Bolzano explains that we will ultimately know this through some reflection, but that the resulting rules of how to divide our knowledge into sciences will be a science in itself. This science, that tells us which truths belong together and should be explained in a textbook, is the ''Theory of Science'' (''Wissenschaftslehre'').

Metaphysics

In the ''Wissenschaftslehre'', Bolzano is mainly concerned with three realms: (1) The realm of language, consisting in words and sentences.
(2) The realm of thought, consisting in subjective ideas and judgements.
(3) The realm of logic, consisting in objective ideas (or ideas in themselves) and propositions in themselves. Bolzano devotes a great part of the ''Wissenschaftslehre'' to an explanation of these realms and their relations. Two distinctions play a prominent role in his system. First, the distinction between parts and wholes. For instance, words are parts of sentences, subjective ideas are parts of judgments, objective ideas are parts of propositions in themselves. Second, all objects divide into those that

exist eXist-db (or eXist for short) is an open source software project for NoSQL databases built on XML technology. It is classified as both a NoSQL document-oriented database system and a native XML database (and it provides support for XML, JSON, ...

, which means that they are causally connected and located in time and/or space, and those that do not exist. Bolzano's original claim is that the logical realm is populated by objects of the latter kind.

''Satz an Sich'' (proposition in itself)

''Satz an Sich'' is a basic notion in Bolzano's ''Wissenschaftslehre''. It is introduced at the very beginning, in section 19. Bolzano first introduces the notions of

proposition In logic and linguistics, a proposition is the meaning of a declarative sentence. In philosophy, " meaning" is understood to be a non-linguistic entity which is shared by all sentences with the same meaning. Equivalently, a proposition is the no ...

(spoken or written or thought or in itself) and

idea In common usage and in philosophy, ideas are the results of thought. Also in philosophy, ideas can also be mental representational images of some object. Many philosophers have considered ideas to be a fundamental ontological category of bei ...

(spoken or written or thought or in itself). "The grass is green" is a proposition (''Satz''): in this connection of words, something is said or asserted. "Grass", however, is only an idea (''Vorstellung''). Something is represented by it, but it does not assert anything. Bolzano's notion of proposition is fairly broad: "A rectangle is round" is a proposition — even though it is false by virtue of self-

contradiction In traditional logic, a contradiction occurs when a proposition conflicts either with itself or established fact. It is often used as a tool to detect disingenuous beliefs and bias. Illustrating a general tendency in applied logic, Aristotle's ...

— because it is composed in an intelligible manner out of intelligible parts. Bolzano does not give a complete definition of a ''Satz an Sich'' (i.e. proposition in itself) but he gives us just enough information to understand what he means by it. A proposition in itself (i) has no existence (that is: it has no position in time or place), (ii) is either true or false, independent of anyone knowing or thinking that it is true or false, and (iii) is what is 'grasped' by thinking beings. So a written sentence ('Socrates has wisdom') grasps a proposition in itself, namely the proposition ocrates has wisdom The written sentence does have existence (it has a certain location at a certain time, say it is on your computer screen at this very moment) and expresses the proposition in itself which is in the realm of in itself (i.e. ''an sich''). (Bolzano's use of the term ''an sich'' differs greatly from that of

Kant Immanuel Kant (, , ; 22 April 1724 – 12 February 1804) was a German philosopher and one of the central Enlightenment thinkers. Born in Königsberg, Kant's comprehensive and systematic works in epistemology, metaphysics, ethics, and aest ...

; for Kant's use of the term see ''an sich''.) Every proposition in itself is composed out of ideas in themselves (for simplicity, we will use ''proposition'' to mean "proposition in itself" and ''idea'' to refer to an objective idea or idea in itself. Ideas are negatively defined as those parts of a proposition that are themselves not propositions. A proposition consists of at least three ideas, namely: a subject idea, a predicate idea and the copula (i.e. 'has', or another form of ''to have''). (Though there are propositions which contain propositions, we won't take them into consideration right now.) Bolzano identifies certain types of ideas. There are simple ideas that have no parts (as an example Bolzano uses omething, but there are also complex ideas that consist of other ideas (Bolzano uses the example of othing which consists of the ideas otand omething. Complex ideas can have the same content (i.e. the same parts) without being the same — because their components are differently connected. The idea black pen with blue inkis different from the idea blue pen with black inkthough the parts of both ideas are the same.

Ideas and objects

It is important to understand that an idea does not need to have an object. Bolzano uses ''object'' to denote something that is represented by an idea. An idea that has an object, represents that object. But an idea that does not have an object represents nothing. (Don't get confused here by terminology: an objectless idea is an idea without a representation.) Consider, for further explanation, an example used by Bolzano. The idea round square does not have an object, because the object that ought to be represented is self-contrary. A different example is the idea othingwhich certainly does not have an object. However, the proposition he idea of a round square has complexityhas as its subject-idea he idea of a round square This subject-idea does have an object, namely the idea round square But, that idea does not have an object. Besides objectless ideas, there are ideas that have only one object, e.g. the idea he first man on the moonrepresents only one object. Bolzano calls these ideas 'singular ideas'. Obviously there are also ideas that have many objects (e.g. he citizens of Amsterdam and even infinitely many objects (e.g. prime number.

Sensation and simple ideas

Bolzano has a complex theory of how we are able to sense things. He explains sensation by means of the term intuition, in German called ''Anschauung''. An intuition is a simple idea, it has only one object (''Einzelvorstellung''), but besides that, it is also unique (Bolzano needs this to explain sensation). Intuitions (''Anschauungen'') are objective ideas, they belong to the ''an sich'' realm, which means that they don't have existence. As said, Bolzano's argumentation for intuitions is by an explanation of sensation. What happens when you sense a real existing object, for instance a rose, is this: the different aspects of the rose, like its scent and its color, cause in you a change. That change means that before and after sensing the rose, your mind is in a different state. So sensation is in fact a change in your mental state. How is this related to objects and ideas? Bolzano explains that this change, in your mind, is essentially a simple idea (''Vorstellung''), like, ‘this smell’ (of this particular rose). This idea represents; it has as its object the change. Besides being simple, this change must also be unique. This is because literally you can't have the same experience twice, nor can two people, who smell the same rose at the same time, have exactly the same experience of that smell (although they will be quite alike). So each single sensation causes a single (new) unique and simple idea with a particular change as its object. Now, this idea in your mind is a subjective idea, meaning that it is in you at a particular time. It has existence. But this subjective idea must correspond to, or has as a content, an objective idea. This is where Bolzano brings in intuitions (''Anschauungen''); they are the simple, unique and objective ideas that correspond to our subjective ideas of changes caused by sensation. So for each single possible sensation, there is a corresponding objective idea. Schematically the whole process is like this: whenever you smell a rose, its scent causes a change in you. This change is the object of your subjective idea of that particular smell. That subjective idea corresponds to the intuition or ''Anschauung''.

Logic

According to Bolzano, all propositions are composed out of three (simple or complex) elements: a subject, a predicate and a copula. Instead of the more traditional copulative term 'is', Bolzano prefers 'has'. The reason for this is that 'has', unlike 'is', can connect a concrete term, such as 'Socrates', to an abstract term such as 'baldness'. "Socrates has baldness" is, according to Bolzano, preferable to "Socrates is bald" because the latter form is less basic: 'bald' is itself composed of the elements 'something', 'that', 'has' and 'baldness'. Bolzano also reduces existential propositions to this form: "Socrates exists" would simply become "Socrates has existence (''Dasein'')". A major role in Bolzano's logical theory is played by the notion of ''variations'': various logical relations are defined in terms of the changes in

truth value In logic and mathematics, a truth value, sometimes called a logical value, is a value indicating the relation of a proposition to truth, which in classical logic has only two possible values ('' true'' or '' false''). Computing In some pro ...

that propositions incur when their non-logical parts are replaced by others. Logically analytical propositions, for instance, are those in which all the non-logical parts can be replaced without change of truth value. Two propositions are 'compatible' (''verträglich'') with respect to one of their component parts x if there is at least one term that can be inserted that would make both true. A proposition Q is 'deducible' (''ableitbar'') from a proposition P, with respect to certain of their non-logical parts, if any replacement of those parts that makes P true also makes Q true. If a proposition is deducible from another with respect to all its non-logical parts, it is said to be 'logically deducible'. Besides the relation of deducibility, Bolzano also has a stricter relation of ' grounding' (''Abfolge''). This is an

asymmetric relation In mathematics, an asymmetric relation is a binary relation R on a set X where for all a, b \in X, if a is related to b then b is ''not'' related to a. Formal definition A binary relation on X is any subset R of X \times X. Given a, b \in X, ...

that obtains between true propositions, when one of the propositions is not only deducible from, but also explained by the other.

Truth

Bolzano distinguishes five meanings the words ''true'' and ''truth'' have in common usage, all of which Bolzano takes to be unproblematic. The meanings are listed in order of properness: I. Abstract objective meaning: ''Truth'' signifies an attribute that may apply to a proposition, primarily to a proposition in itself, namely the attribute on the basis of which the proposition expresses something that in reality is as is expressed. Antonyms: ''falsity, falseness, falsehood''. II. Concrete objective meaning: (a) ''Truth'' signifies a proposition that has the attribute ''truth'' in the abstract objective meaning. Antonym: (a) ''falsehood''. III. Subjective meaning: (a) ''Truth'' signifies a correct judgment. Antonym: (a) ''mistake''. IV. Collective meaning: ''Truth'' signifies a body or multiplicity true propositions or judgments (e.g. the biblical truth). V. Improper meaning: ''True'' signifies that some object is in reality what some denomination states it to be. (e.g. the true God). Antonyms: ''false, unreal, illusory''. Bolzano's primary concern is with the concrete objective meaning: with concrete objective truths or truths in themselves. All truths in themselves are a kind of propositions in themselves. They do not exist, i.e. they are not spatiotemporally located as thought and spoken propositions are. However, certain propositions have the attribute of being a truth in itself. Being a thought proposition is not a part of the concept of a truth in itself, notwithstanding the fact that, given God's omniscience, all truths in themselves are also thought truths. The concepts ‘truth in itself’ and ‘thought truth’ are interchangeable, as they apply to the same objects, but they are not identical. Bolzano offers as the correct definition of (abstract objective) truth: a proposition is true if it expresses something that applies to its object. The correct definition of a (concrete objective) truth must thus be: a truth is a proposition that expresses something that applies to its object. This definition applies to truths in themselves, rather than to thought or known truths, as none of the concepts figuring in this definition are subordinate to a concept of something mental or known. Bolzano proves in §§31–32 of his ''Wissenschaftslehre'' three things: There is at least one truth in itself (concrete objective meaning): :1. There are no true propositions (assumption) :2. 1. is a proposition (obvious) :3. 1. is true (assumed) and false (because of 1.) :4. 1. is self-contradictory (because of 3.) :5. 1. is false (because of 4.) :6. There is at least one true proposition (because of 1. and 5.) B. There is more than one truth in itself: :7. There is only one truth in itself, namely A is B (assumption) :8. A is B is a truth in itself (because of 7.) :9. There are no other truths in themselves apart from A is B (because of 7.) :10. 9. is a true proposition/ a truth in itself (because of 7.) :11. There are two truths in themselves (because of 8. and 10.) :12. There is more than one truth in itself (because of 11.) C. There are infinitely many truths in themselves: :13. There are only n truths in themselves, namely A is B .... Y is Z (assumption) :14. A is B .... Y is Z are n truths in themselves (because of 13.) :15. There are no other truths apart from A is B .... Y is Z (because of 13.) :16. 15. is a true proposition/ a truth in itself (because of 13.) :17. There are n+1 truths in themselves (because of 14. and 16.) :18. Steps 1 to 5 can be repeated for n+1, which results in n+2 truths and so on endlessly (because n is a variable) :19. There are infinitely many truths in themselves (because of 18.)

Judgments and cognitions

A known truth has as its parts (''Bestandteile'') a truth in itself and a judgment (Bolzano, ''Wissenschaftslehre'' §26). A judgment is a thought which states a true proposition. In judging (at least when the matter of the judgment is a true proposition), the idea of an object is being connected in a certain way with the idea of a characteristic (§ 23). In true judgments, the relation between the idea of the object and the idea of the characteristic is an actual/existent relation (§28). Every judgment has as its matter a proposition, which is either true or false. Every judgment exists, but not "für sich". Judgments, namely, in contrast with propositions in themselves, are dependent on subjective mental activity. Not every mental activity, though, has to be a judgment; recall that all judgments have as matter propositions, and hence all judgments need to be either true or false. Mere presentations or thoughts are examples of mental activities which do not necessarily need to be stated (behaupten), and so are not judgments (§ 34). Judgments that have as its matter true propositions can be called cognitions (§36). Cognitions are also dependent on the subject, and so, opposed to truths in themselves, cognitions do permit degrees; a proposition can be more or less known, but it cannot be more or less true. Every cognition implies necessarily a judgment, but not every judgment is necessarily cognition, because there are also judgments that are not true. Bolzano maintains that there are no such things as false cognitions, only false judgments (§34).

Philosophical legacy

Bolzano came to be surrounded by a circle of friends and pupils who spread his thoughts about (the so-called Bolzano Circle), but the effect of his thought on philosophy initially seemed destined to be slight. Alois Höfler (1853–1922), a former student of Brentano and Meinong, who subsequently become professor of

pedagogy Pedagogy (), most commonly understood as the approach to teaching, is the theory and practice of learning, and how this process influences, and is influenced by, the social, political and psychological development of learners. Pedagogy, taken ...

at the

University of Vienna The University of Vienna (german: Universität Wien) is a public research university located in Vienna, Austria. It was founded by Duke Rudolph IV in 1365 and is the oldest university in the German-speaking world. With its long and rich hist ...

, created the "missing link between the

Vienna Circle The Vienna Circle (german: Wiener Kreis) of Logical Empiricism was a group of elite philosophers and scientists drawn from the natural and social sciences, logic and mathematics who met regularly from 1924 to 1936 at the University of Vienna, ch ...

and the Bolzano tradition in Austria." Bolzano's work was rediscovered, however, by

Edmund Husserl , thesis1_title = Beiträge zur Variationsrechnung (Contributions to the Calculus of Variations) , thesis1_url = https://fedora.phaidra.univie.ac.at/fedora/get/o:58535/bdef:Book/view , thesis1_year = 1883 , thesis2_title ...

and Kazimierz Twardowski, both students of

Franz Brentano Franz Clemens Honoratus Hermann Josef Brentano (; ; 16 January 1838 – 17 March 1917) was an influential German philosopher, psychologist, and former Catholic priest (withdrawn in 1873 due to the definition of papal infallibility in matters ...

. Through them, Bolzano became a formative influence on both phenomenology and analytic philosophy.

Writings

* ''Bolzano: Gesamtausgabe'' (''Bolzano: Collected Works''), critical edition edited by Eduard Winter, , Friedrich Kambartel, Bob van Rootselaar, Stuttgart: Fromman-Holzboog, 1969ff. (103 Volumes available, 28 Volumes in preparation).frommann-holzboog.de
/ref> * ''Wissenschaftslehre'', 4 vols., 2nd rev. ed. by W. Schultz, Leipzig I–II 1929, III 1980, IV 1931; Critical Edition edited by Jan Berg: Bolzano's Gesamtausgabe, vols. 11–14 (1985–2000). * ''Bernard Bolzano's Grundlegung der Logik. Ausgewählte Paragraphen aus der Wissenschaftslehre'', Vols. 1 and 2, with supplementary text summaries, an introduction and indices, edited by F. Kambartel, Hamburg, 1963, 1978². * (''Contributions to a better grounded presentation of mathematics''; and ''The Mathematical Works of Bernard Bolzano'', 2004, pp. 83–137). * (''Purely analytic proof of the theorem that between any two values which give results of opposite sign, there lies at least one real root of the equation''; . * Franz Prihonsky (1850), ''Der Neue Anti-Kant'', Bautzen (an assessment of the ''Critique of Pure Reason'' by Bolzano, published posthumously by his friend F. Prihonsky).* (''Paradoxes of the Infinite''; (excerpt)). Most of Bolzano's work remained in manuscript form, so it had a very small circulation and little influence on the development of the subject.

Translations and compilations

*
Theory of Science
' (selection edited and translated by Rolf George, Berkeley and Los Angeles: University of California Press, 1972). *

' (selection edited, with an introduction, by Jan Berg. Translated from the German by Burnham Terrell, Dordrecht and Boston: D. Reidel Publishing Company, 1973). * ''Theory of Science'', first complete English translation in four volumes by Rolf George and Paul Rusnock, New York: Oxford University Press, 2014. * ''The Mathematical Works of Bernard Bolzano'', translated and edited by Steve Russ, New York: Oxford University Press, 2004 (re-printed 2006). * ''On the Mathematical Method and Correspondence with Exner'', translated by Rolf George and Paul Rusnock, Amsterdam: Rodopi, 2004. * ''Selected Writings on Ethics and Politics'', translated by Rolf George and Paul Rusnock, Amsterdam: Rodopi, 2007. * Franz Prihonsky, ''The New Anti-Kant'', edited by Sandra Lapointe and Clinton Tolley, New York, Palgrave Macmillan, 2014. * (Translation of ''Rein analytischer Beweis des Lehrsatzes, dass zwischen je zwey Werthen, die ein entgegengesetzes Resultat gewähren, wenigstens eine reelle Wurzel der Gleichung liege'' (Prague 1817))

Notes

References

* . * . * . * . Retrieved on 2007-03-05 * .

External links