The following pages link to On Cramér's theorem for capacities (Q710852):
Displaying 15 items.
- How big are the increments of \(G\)-Brownian motion? (Q477151) (← links)
- An upper bound of large deviations for capacities (Q1718577) (← links)
- Moderate deviations principle for independent random variables under sublinear expectations (Q2047156) (← links)
- Concentration inequalities for upper probabilities (Q2069461) (← links)
- Large deviation principle for reflected stochastic differential equations driven by G-Brownian motion in non-convex domains (Q2105378) (← links)
- Large deviation principle for random variables under sublinear expectations on \(\mathbb{R}^d\) (Q2173797) (← links)
- Representation of weakly maxitive monetary risk measures and their rate functions (Q2695985) (← links)
- Large deviation for negatively dependent random variables under sublinear expectation (Q2807689) (← links)
- ENTROPIC RISK MEASURES: COHERENCE VS. CONVEXITY, MODEL AMBIGUITY AND ROBUST LARGE DEVIATIONS (Q3173994) (← links)
- A non-exponential extension of Sanov’s theorem via convex duality (Q3298814) (← links)
- Worst-case large deviations upper bounds for i.i.d. sequencesunder ambiguity (Q4633747) (← links)
- The modulus of continuity theorem for <font><i>G</i></font>-Brownian motion (Q4976236) (← links)
- On complete convergence for extended independent random variables under sub-linear expectations (Q5108981) (← links)
- Large deviation principle for linear processes generated by real stationary sequences under the sub-linear expectation (Q6170131) (← links)
- On the moderate deviation principle for \(m\)-dependent random variables with sublinear expectation (Q6587430) (← links)