Probabilistic logic (also probability logic and probabilistic reasoning) involves the use of probability and logic to deal with uncertain situations. Probabilistic logic extends traditional logic

truth table A truth table is a mathematical table used in logic—specifically in connection with Boolean algebra, boolean functions, and propositional calculus—which sets out the functional values of logical expressions on each of their functional argumen ...

s with probabilistic expressions. A difficulty of probabilistic logics is their tendency to multiply the computational complexities of their probabilistic and logical components. Other difficulties include the possibility of counter-intuitive results, such as in case of belief fusion in

Dempster–Shafer theory The theory of belief functions, also referred to as evidence theory or Dempster–Shafer theory (DST), is a general framework for reasoning with uncertainty, with understood connections to other frameworks such as probability, possibility and ...

. Source trust and epistemic uncertainty about the probabilities they provide, such as defined in subjective logic, are additional elements to consider. The need to deal with a broad variety of contexts and issues has led to many different proposals.

Logical background

There are numerous proposals for probabilistic logics. Very roughly, they can be categorized into two different classes: those logics that attempt to make a probabilistic extension to logical entailment, such as

Markov logic network A Markov logic network (MLN) is a probabilistic logic which applies the ideas of a Markov network to first-order logic, enabling uncertain inference. Markov logic networks generalize first-order logic, in the sense that, in a certain limit, all un ...

s, and those that attempt to address the problems of uncertainty and lack of evidence (evidentiary logics). That the concept of probability can have different meanings may be understood by noting that, despite the mathematization of probability in the Enlightenment, mathematical

probability theory Probability theory is the branch of mathematics concerned with probability. Although there are several different probability interpretations, probability theory treats the concept in a rigorous mathematical manner by expressing it through a set ...

remains, to this very day, entirely unused in criminal courtrooms, when evaluating the "probability" of the guilt of a suspected criminal.James Franklin, ''The Science of Conjecture: Evidence and Probability before Pascal'', 2001 The Johns Hopkins Press, . More precisely, in evidentiary logic, there is a need to distinguish the objective truth of a statement from our decision about the truth of that statement, which in turn must be distinguished from our confidence in its truth: thus, a suspect's real guilt is not necessarily the same as the judge's decision on guilt, which in turn is not the same as assigning a numerical probability to the commission of the crime, and deciding whether it is above a numerical threshold of guilt. The verdict on a single suspect may be guilty or not guilty with some uncertainty, just as the flipping of a coin may be predicted as heads or tails with some uncertainty. Given a large collection of suspects, a certain percentage may be guilty, just as the probability of flipping "heads" is one-half. However, it is incorrect to take this law of averages with regard to a single criminal (or single coin-flip): the criminal is no more "a little bit guilty" than predicting a single coin flip to be "a little bit heads and a little bit tails": we are merely uncertain as to which it is. Expressing uncertainty as a numerical probability may be acceptable when making scientific measurements of physical quantities, but it is merely a mathematical model of the uncertainty we perceive in the context of "common sense" reasoning and logic. Just as in courtroom reasoning, the goal of employing uncertain inference is to gather evidence to strengthen the confidence of a proposition, as opposed to performing some sort of probabilistic entailment.

Historical context

Historically, attempts to quantify probabilistic reasoning date back to antiquity. There was a particularly strong interest starting in the 12th century, with the work of the

Scholastics Scholasticism was a medieval school of philosophy that employed a critical organic method of philosophical analysis predicated upon the Aristotelian 10 Categories. Christian scholasticism emerged within the monastic schools that translat ...

, with the invention of the

half-proof Half-proof ''(semiplena probatio)'' was a concept of medieval Roman law, describing a level of evidence between mere suspicion and the full proof (''plena probatio'') needed to convict someone of a crime. The concept was introduced by the Glossator ...

(so that two half-proofs are sufficient to prove guilt), the elucidation of moral certainty (sufficient certainty to act upon, but short of absolute certainty), the development of Catholic probabilism (the idea that it is always safe to follow the established rules of doctrine or the opinion of experts, even when they are less probable), the

case-based reasoning In artificial intelligence and philosophy, case-based reasoning (CBR), broadly construed, is the process of solving new problems based on the solutions of similar past problems. In everyday life, an auto mechanic who fixes an engine by recallin ...

casuistry In ethics, casuistry ( ) is a process of reasoning that seeks to resolve moral problems by extracting or extending theoretical rules from a particular case, and reapplying those rules to new instances. This method occurs in applied ethics and j ...

, and the scandal of Laxism (whereby probabilism was used to give support to almost any statement at all, it being possible to find an expert opinion in support of almost any proposition.).

Modern proposals

Below is a list of proposals for probabilistic and evidentiary extensions to classical and

predicate logic First-order logic—also known as predicate logic, quantificational logic, and first-order predicate calculus—is a collection of formal systems used in mathematics, philosophy, linguistics, and computer science. First-order logic uses quantifi ...

. * The term "''probabilistic logic''" was first used in a paper by Nils Nilsson published in 1986, where the truth values of sentences are probabilities.Nilsson, N. J., 1986, "Probabilistic logic," ''Artificial Intelligence'' 28(1): 71-87. The proposed semantical generalization induces a probabilistic logical

entailment 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 one ...

, which reduces to ordinary logical

when the probabilities of all sentences are either 0 or 1. This generalization applies to any

logical system A formal system is an abstract structure used for inferring theorems from axioms according to a set of rules. These rules, which are used for carrying out the inference of theorems from axioms, are the logical calculus of the formal system. A form ...

for which the consistency of a finite set of sentences can be established. * The central concept in the theory of subjective logicA. Jøsang.
Subjective Logic: A formalism for reasoning under uncertainty
'. Springer Verlag, 2016 is ''opinions'' about some of the

propositional variable In mathematical logic, a propositional variable (also called a sentential variable or sentential letter) is an input variable (that can either be true or false) of a truth function. Propositional variables are the basic building-blocks of proposit ...

s involved in the given logical sentences. A binomial opinion applies to a single proposition and is represented as a 3-dimensional extension of a single probability value to express probabilistic and epistemic uncertainty about the truth of the proposition. For the computation of derived opinions based on a structure of argument opinions, the theory proposes respective operators for various logical connectives, such as e.g. multiplication (

AND or AND may refer to: Logic, grammar, and computing * Conjunction (grammar), connecting two words, phrases, or clauses * Logical conjunction in mathematical logic, notated as "∧", "⋅", "&", or simple juxtaposition * Bitwise AND, a boolea ...

), comultiplication ( OR), division (UN-AND) and co-division (UN-OR) of opinions,Jøsang, A. and McAnally, D., 2004, "Multiplication and Comultiplication of Beliefs," ''International Journal of Approximate Reasoning'', 38(1), pp.19-51, 2004 conditional deduction ( MP) and abduction ( MT).,Jøsang, A., 2008,
Conditional Reasoning with Subjective Logic
" ''Journal of Multiple-Valued Logic and Soft Computing'', 15(1), pp.5-38, 2008 as well as

Bayes' theorem In probability theory and statistics, Bayes' theorem (alternatively Bayes' law or Bayes' rule), named after Thomas Bayes, describes the probability of an event, based on prior knowledge of conditions that might be related to the event. For examp ...

.A. Jøsang
Generalising Bayes' Theorem in Subjective Logic
''2016 IEEE International Conference on Multisensor Fusion and Integration for Intelligent Systems (MFI 2016)'', Baden-Baden, Germany, 2016. * The approximate reasoning formalism proposed by

fuzzy logic Fuzzy logic is a form of many-valued logic in which the truth value of variables may be any real number between 0 and 1. It is employed to handle the concept of partial truth, where the truth value may range between completely true and complete ...

can be used to obtain a logic in which the models are the probability distributions and the theories are the lower envelopes.Gerla, G., 1994,
Inferences in Probability Logic
" ''Artificial Intelligence'' 70(1–2):33–52. In such a logic the question of the consistency of the available information is strictly related with the one of the coherence of partial probabilistic assignment and therefore with

Dutch book In gambling, a Dutch book or lock is a set of odds and bets, established by the bookmaker, that ensures that the bookmaker will profit—at the expense of the gamblers—regardless of the outcome of the event (a horse race, for example) on whic ...

phenomena. *

s implement a form of

uncertain inference Uncertain inference was first described by C. J. van Rijsbergen as a way to formally define a query and document relationship in Information retrieval. This formalization is a logical implication with an attached measure of uncertainty. Definitions ...

based on the

maximum entropy principle The principle of maximum entropy states that the probability distribution which best represents the current state of knowledge about a system is the one with largest entropy, in the context of precisely stated prior data (such as a proposition ...

—the idea that probabilities should be assigned in such a way as to maximize entropy, in analogy with the way that

Markov chain A Markov chain or Markov process is a stochastic model describing a sequence of possible events in which the probability of each event depends only on the state attained in the previous event. Informally, this may be thought of as, "What happe ...

s assign probabilities to

finite state machine A finite-state machine (FSM) or finite-state automaton (FSA, plural: ''automata''), finite automaton, or simply a state machine, is a mathematical model of computation. It is an abstract machine that can be in exactly one of a finite number o ...

transitions. * Systems such as Pei Wang's Non-Axiomatic Reasoning System (NARS) or Ben Goertzel's Probabilistic Logic Networks (PLN) add an explicit confidence ranking, as well as a probability to atoms and sentences. The rules of deduction and induction incorporate this uncertainty, thus side-stepping difficulties in purely Bayesian approaches to logic (including Markov logic), while also avoiding the paradoxes of

. The implementation of PLN attempts to use and generalize algorithms from logic programming, subject to these extensions. * In the field of probabilistic argumentation, various formal frameworks have been put forward. The framework of "probabilistic labellings",Riveret, R.; Baroni, P.; Gao, Y.; Governatori, G.; Rotolo, A.; Sartor, G. (2018), "A Labelling Framework for Probabilistic Argumentation", Annals of Mathematics and Artificial Intelligence, 83: 221–287. for example, refers to probability spaces where a sample space is a set of labellings of argumentation graphs. In the framework of "probabilistic argumentation systems"Kohlas, J., and Monney, P.A., 1995.
A Mathematical Theory of Hints. An Approach to the Dempster–Shafer Theory of Evidence
'. Vol. 425 in Lecture Notes in Economics and Mathematical Systems. Springer Verlag.Haenni, R, 2005,
Towards a Unifying Theory of Logical and Probabilistic Reasoning
" ISIPTA'05, 4th International Symposium on Imprecise Probabilities and Their Applications: 193-202. probabilities are not directly attached to arguments or logical sentences. Instead it is assumed that a particular subset

W

of the variables

V

involved in the sentences defines a

probability space In probability theory, a probability space or a probability triple (\Omega, \mathcal, P) is a mathematical construct that provides a formal model of a random process or "experiment". For example, one can define a probability space which models t ...

over the corresponding sub-

σ-algebra In mathematical analysis and in probability theory, a σ-algebra (also σ-field) on a set ''X'' is a collection Σ of subsets of ''X'' that includes the empty subset, is closed under complement, and is closed under countable unions and countabl ...

. This induces two distinct probability measures with respect to

V

, which are called ''degree of support'' and ''degree of possibility'', respectively. Degrees of support can be regarded as non-additive ''probabilities of provability'', which generalizes the concepts of ordinary logical

(for

V=\

) and classical posterior probabilities (for

V=W

). Mathematically, this view is compatible with the

. * The theory of evidential reasoningRuspini, E.H., Lowrance, J., and Strat, T., 1992,
Understanding evidential reasoning
" ''International Journal of Approximate Reasoning'', 6(3): 401-424. also defines non-additive ''probabilities of probability'' (or ''epistemic probabilities'') as a general notion for both logical

(provability) and

probability Probability is the branch of mathematics concerning numerical descriptions of how likely an event is to occur, or how likely it is that a proposition is true. The probability of an event is a number between 0 and 1, where, roughly speaking, ...

. The idea is to augment standard

propositional logic Propositional calculus is a branch of logic. It is also called propositional logic, statement logic, sentential calculus, sentential logic, or sometimes zeroth-order logic. It deals with propositions (which can be true or false) and relations ...

by considering an epistemic operator K that represents the state of knowledge that a rational agent has about the world. Probabilities are then defined over the resulting ''epistemic universe'' K''p'' of all propositional sentences ''p'', and it is argued that this is the best information available to an analyst. From this view,

appears to be a generalized form of probabilistic reasoning.

References

{{reflist

External links

Subjective logic demonstrations

''The Society for Imprecise Probability''
Probabilistic arguments Non-classical logic Formal epistemology

Logical background

Historical context

Modern proposals

See also

References

Further reading

External links