EQUILIBRIUM PROBLEMS

Abstract. We propose a splitting algorithm for solving strongly equilibrium problems over the intersection of a finite number of closed convex sets given as the xed pointsets of nonexpansive mappings in a real Hilbert space. The algorithm is a combination between the gradient method and the MannKr[r]

The purpose of this paper is to propose some hybrid extragradientArmijo algorithms for
finding a common element of the set of solutions of a finite family of pseudomonotone equilibrium problems
and the set of fixed points of a finite family of nonexpansive mappings in real Hilbert spaces. The propos[r]

We propose a strongly convergent algorithm for finding a common point in
the solution set of a class of pseudomonotone equilibrium problems and the set of fixed
points of nonexpansive mappings in a real Hilbert space. The proposed algorithm uses
only one projection and does not require any Lipschitz[r]

In this paper we propose and analyze three parallel hybrid extragradient methods for finding a
common element of the set of solutions of equilibrium problems involving pseudomonotone bifunctions
{fi(x, y)}N
i=1 and the set of fixed points of nonexpansive mappings {Sj}M
j=1 in a real Hilbert space.
B[r]

Abstract In this paper we propose two strongly convergent parallel hybrid
iterative methods for finding a common element of the set of fixed points of a
family of asymptotically quasi φnonexpansive mappings, the set of solutions
of variational inequalities and the set of solutions of equilibrium pro[r]

Abstract: We show solutionexistence and develop algorithms for solving strongly pseudomonotone equilibrium problems in real Hilbert spaces. We study convergence rate for the proposed algorithms. Application to variational inequalities is discussed.

In this paper, we suggest a new iteration scheme for finding a common of thesolution set of monotone, Lipschitztype continuous equilibrium problems and theset of fixed points of a nonexpansive mapping. The scheme is based on both hybrid method and extragradienttype method. We obtain a strong converg[r]

In this paper we propose an iteration hybrid method for approximating a
point in the intersection of the solutionsets of pseudomonotone equilibrium and variational
inequality problems and the fixed points of a semigroupnonexpensive mappings in Hilbert
spaces. The method is a combination of projectio[r]

1 Introduction3[38]. Namely, this author considered three kinds of equilibrium: weak vector equilibrium,strong vector equilibrium and ideal vector equilibrium, and constructed equivalent vectorvariational inequalities over elementary flows. In the above cited works on mul[r]

consumers prefer one to the otherindependently of the price. Soneither firm has to exactly match aprice cut by its rival.– Nash-Bertrand Equilibrium atintersection point e, p2 = p1 = $13 >MC– Plausible: Firms set p > MC, andprices are sensitive to demandconditions and number of[r]

the equilibrium price is still determined in themarket by the forces of demand and supplyRevenues of the FirmTotal revenue (TR) is the firm's gross income from the sale of itsproductTR=P.QMarginal revenue (MR) is the additional revenue earned fromeach additional unit of output sold.MR=∆TR/[r]

(see Allen, Qian, and Qian 2005). Using firm-level survey data, Ayyagari,Demirgu¨c¸-Kunt, and Maksimovic (2008a) find, however, that despite the financial sector weaknesses, financing from the formal financial system is associatedwith faster firm growth, whereas raising financing from alternative ch[r]

The equilibrium potential is then given by: It can be represented in an E-pH diagram for equal activity in and by a decreasing line in Fig. 15. Fig. 15 Partial E-pH diagram for the + 8H+ + 6e- + 2H2O reaction Above the line, there is a region in which is predominantly stable but in equi[r]

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19.3 The Constant-Volume Gas Thermometer and the Absolute Temperature Scaleat constant temperature. One such system is a mixture of water and ice in thermalequilibrium at atmospheric pressure. On the Celsius temperature scale, this mixture is defined to have a temperature of zero degrees Celsius, wh[r]

In the first input-output study Leontief (1936) presented the so-called closed model: Alloutputs are also used as inputs. Industries produce commodities using commodities as wellas factor inputs. Households produce these factor inputs using commodities. This, of course,is very much in the spirit of[r]

most of the interesting aspects seen here, and produce a smooth object thatgrows linearly with distance downstream. Even in such smooth objects, theaverages vary along the length and width of the flow, these variations beinga measure of the spatial inhomogeneity of turbulence. The inhomogeneity istyp[r]

Money DemandMoney demand is determined by severalfactors.According to the theory of liquiditypreference, one of the most important factorsis the interest rate.People choose to hold money because moneycan be used to buy other goods and services.Harcourt, Inc. items and derived items copyright © 2001[r]

Cân bằng chung pooling equilibrium: là giải pháp của cuộc đấu trí trong đó các bên có tính chất khác nhau áp dụng cùng một chiến lược và vì vậy ngăn người không có thông tin đọc được tín[r]

Static Games of CompleteInformationIn this chapter we consider games of the following simple form:first the players simultaneously choose actions; then the playersreceive payoffs that depend on the combination of actions just chosen. Within the class of such static (or simultaneous-move) games,we re[r]