In the online random-arrival model, an algorithm receives a sequence of $n$ requests that arrive in a random order. The algorithm is expected to make an irrevocable decision with regard to each request based only on the observed history. We consider the following natural extension of this model: each request arrives k times, and the arrival order is a random permutation of the kn arrivals; the algorithm is expected to make a decision regarding each request only upon its last arrival. We focus primarily on the case when k=2, which can also be interpreted as each request arriving at, and departing from the system, at a random time. We examine the secretary problem: the problem of selecting the best secretary when the secretaries are pres...
The classical analysis of online algorithms, due to its worst-case nature, can be quite pessimistic ...
AbstractThis article considers a modification of the secretary problem with random number of applica...
The secretary problem became one of the most prominent online selection problems due to its numerous...
We study online secretary problems with returns in combinatorial packing domains with n candidates t...
We study online secretary problems with returns in combinatorial packing domains with n candidates t...
In classical secretary problems, a sequence of n elements arrive in a uniformly random order, and we...
We consider the general (J, K)-secretary problem, where n totally ordered items arrive in a random o...
textabstractThe classical secretary problem studies the problem of selecting online an element (a “s...
In online algorithms, a decider has to make irrevocable decisions before she has received all releva...
Candidates arrive sequentially for an interview process which results in them being ranked relative ...
In the secretary problem we are faced with an online sequence of elements with values. Upon seeing a...
In an online problem, information is revealed incrementally and decisions have to be made before the...
The secretary problem is a classic model for online decision making. Recently, combinatorial extensi...
In the classical secretary problem, a set S of numbers is presented to an online algorithm in random...
The classical secretary problem studies the problem of hir-ing the best secretary from among the sec...
The classical analysis of online algorithms, due to its worst-case nature, can be quite pessimistic ...
AbstractThis article considers a modification of the secretary problem with random number of applica...
The secretary problem became one of the most prominent online selection problems due to its numerous...
We study online secretary problems with returns in combinatorial packing domains with n candidates t...
We study online secretary problems with returns in combinatorial packing domains with n candidates t...
In classical secretary problems, a sequence of n elements arrive in a uniformly random order, and we...
We consider the general (J, K)-secretary problem, where n totally ordered items arrive in a random o...
textabstractThe classical secretary problem studies the problem of selecting online an element (a “s...
In online algorithms, a decider has to make irrevocable decisions before she has received all releva...
Candidates arrive sequentially for an interview process which results in them being ranked relative ...
In the secretary problem we are faced with an online sequence of elements with values. Upon seeing a...
In an online problem, information is revealed incrementally and decisions have to be made before the...
The secretary problem is a classic model for online decision making. Recently, combinatorial extensi...
In the classical secretary problem, a set S of numbers is presented to an online algorithm in random...
The classical secretary problem studies the problem of hir-ing the best secretary from among the sec...
The classical analysis of online algorithms, due to its worst-case nature, can be quite pessimistic ...
AbstractThis article considers a modification of the secretary problem with random number of applica...
The secretary problem became one of the most prominent online selection problems due to its numerous...