Kernkonzepte
物理システムの時間制約を自然に定義する連続時間MTLの測定可能性を証明。
Statistiken
"X(ω), t | = φ1UIφ2 holds if and only if X(ω), t | = φ1 holds and one of the following possibilities holds: (1) X(ω), t + a | = φ2 holds and τ1(ω, t) ≥t + a (2) X(ω), t + b | = φ2 holds and τ1(ω, t) ≥t + b holds (3) τ2(ω, t + a) < t + b, X(ω), τ2(ω, t + a) | = φ2 and τ1(ω, t) ≥"
Zitate
"Several previous studies deal with the probability of continuous MTL semantics for stochastic processes."
"Continuous-time MTL can define temporal constraints for physical systems naturally."
"We employ a theorem from stochastic analysis to prove the measurability of hitting times for stochastic processes."