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Metrics for real time probabilistic processes. Radha Jagadeesan, DePaul University Vineet Gupta, Google Inc Prakash Panangaden, McGill University Josee Desharnais, Univ Laval. Outline of talk. Models for real-time probabilistic processes
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Metrics for real time probabilistic processes Radha Jagadeesan, DePaul University Vineet Gupta, Google Inc Prakash Panangaden, McGill University Josee Desharnais, Univ Laval
Outline of talk • Models for real-time probabilistic processes • Approximate reasoning for real-time probabilistic processes
Discrete Time Probabilistic processes • Labelled Markov Processes For each state s For each label a K(s, a, U) Each state labelled with propositional information 0.3 0.5 0.2
Discrete Time Probabilistic processes • Markov Decision Processes For each state s For each label a K(s, a, U) Each state labelled with numerical rewards 0.3 0.5 0.2
Discrete time probabilistic proceses • + nondeterminism : label does not determine probability distribution uniquely.
Real-time probabilistic processes • Add clocks to Markov processes Each clock runs down at fixed rate r c(t) = c(0) – r t Different clocks can have different rates • Generalized SemiMarkov Processes Probabilistic multi-rate timed automata
Generalized semi-Markov processes. Each state labelled with propositional Information Each state has a set of clocks associated with it. {c,d} s {c} u t {d,e}
Generalized semi-Markov processes. Evolution determined by generalized states <state, clock-valuation> <s,c=2, d=1>Transition enabled when a clockbecomes zero {c,d} s {c} u t {d,e}
Generalized semi-Markov processes. <s,c=2, d=1> Transition enabled in 1 time unit <s,c=0.5,d=1> Transition enabled in 0.5 time unit {c,d} s {c} u t {d,e} Clock c Clock d
Generalized semi-Markov processes. Transition determines: a. Probability distribution on next states b. Probability distribution on clock values for new clocks {c,d} s 0.2 0.8 {c} u t {d,e} Clock c Clock d
Generalized semi Markov proceses • If distributions are continuous and states are finite: Zeno traces have measure 0 • Continuity results. If stochastic processes from <s, > converge to the stochastic process at <s, >
Equational reasoning • Establishing equality: Coinduction • Distinguishing states: Modal logics • Equational and logical views coincide • Compositional reasoning: ``bisimulation is a congruence’’
Problem! • Numbers viewed as coming with an error estimate. (eg) Stochastic noise as abstraction Statistical methods for estimating numbers
Problem! • Numbers viewed as coming with an error estimate. • Reasoning in continuous time and continuous space is often via discrete approximations. eg. Monte-Carlo methods to approximate probability distributions by a sample.
Idea: Equivalence metrics • Jou-Smolka, Lincoln-Scedrov-Mitchell-Mitchell Replace equality of processes by (pseudo)metric distances between processes • Quantitative measurement of the distinction between processes.
Criteria on approximate reasoning • Soundness • Usability • Robustness
Criteria on metrics for approximate reasoning • Soundness • Stability of distance under temporal evolution: ``Nearby states stay close '‘ through temporal evolution.
``Usability’’ criteria on metrics • Establishing closeness of states: Coinduction. • Distinguishing states: Real-valued modal logics. • Equational and logical views coincide: Metrics yield same distances as real-valued modal logics.
``Robustness’’ criterion on approximate reasoning • The actual numerical values of the metrics should not matter --- ``upto uniformities’’.
Uniformities (same) m(x,y) = |2x + sinx -2y – siny| m(x,y) = |x-y|
Uniformities (different) m(x,y) = |x-y|
Our results • For Discrete time models: Labelled Markov processes Labelled Concurrent Markov chains Markov decision processes • For continuous time: Generalized semi-Markov processes
Bisimulation • Fix a Markov chain. Define monotone F on equivalence relations:
Defining metric: An attempt Define functional F on metrics.
Metrics on probability measures • Wasserstein-Kantorovich • A way to lift distances from states to a distances on distributions of states.
Example 1: Metrics on probability measures Unit measure concentrated at x Unit measure concentrated at y m(x,y) x y
Example 1: Metrics on probability measures Unit measure concentrated at x Unit measure concentrated at y m(x,y) x y
Defining metric coinductively Define functional F on metrics Desired metric is maximum fixed point of F
Real-valued modal logic Tests:
Results • Modal-logic yields the same distance as the coinductive definition • However, not upto uniformities since glbs in lattice of uniformities is not determined by glbs in lattice of pseudometrics.
Variant definition that works upto uniformities Fix c<1. Define functional F on metrics Desired metric is maximum fixed point of F
Reasoning upto uniformities • For all c<1, get same uniformity [see Breugel/Mislove/Ouaknine/Worrell] • Variant of earlier real-valued modal logic incorporating discount factor c characterizes the metrics
Generalized semi-Markov processes. Evolution determined by generalized states <state, clock-valuation> : Set of generalized states {c,d} s {c} u t {d,e} Clock c Clock d
