Spatial Advertisement Competition : Based on Game Theory

Since advertisement is an important strategy of firms to improve market share, this paper highlights duopoly advertisement under the Hotelling model. A model of advertisement under spatial duopoly is established, and corresponding effects of brand values and transportation costs are all captured.This study presents the proportion of sales revenue spending on advertisement.The condition for free-rider in advertisement investment is discussed. Under firmswith the identical brand values, if firms’ advertisement points to corresponding consumers, price and advertisement investment are all reduced.Therefore, advertisement is discussed under spatial competition in this work.


Introduction
Hotelling [1] initially established a model to offer a rational outlet for spatial competition.Furthermore, there exists extensive research on the Hotelling model in many aspects (see [2][3][4][5]).In a recent paper, Vogel [6] derived interesting results regarding product differentiation in the Hotelling model.Vogel found that a firm's price, market share, and profit were all independent of its neighbors' marginal costs, conditional on the average marginal cost in the market.Vogel also proved that more productive firms were more isolated, all else being equal.Nie [7,8] addressed maintenance commitment under spatial competitions and characterized the relationship between competitions and guarantee commitment under the Hotelling model.Recently, Nie [9] addressed the effects of spatial competitions on the innovation.
In extant literature, the effects of transportation costs on economic activities are extensively captured.Rare papers discuss the effects of spatial competitions on advertisement.This study tries to fill in this gap.This paper aims to capture the effects of spatial competition on the advertisement and to discuss the relationship between the advertisement investment and the spatial competition by industrial organization theory.
Here the literature on advertisement is briefly introduced.Bagwell [10] surveyed the literature about advertisement.
Bagwell [10] divided modern works about advertisement in three groups.The first group employs data sources and evaluates the empirical findings of the earlier empirical work.The second group focuses on new data and reflects the influence of the intervening theoretical work.The third group culls from the intervening theoretical work, which follows Sutton's interesting and significant work [11].Baye and Morgan [12] recently developed exogenous advertisement theory.Bagwell and Lee [13] recently discussed the nonprice advertisement competitions in retail and argued that under free entry, social surplus is higher when advertising is allowed.
This work discusses duopoly advertisement under spatial competitions.The effects of brand values and transportation costs on advertisement investment are characterized.The proportion of sales revenue spending on advertisement is achieved.Since the effects of advertisement investment exist in the market, conditions for free-rider are discussed.The advertisement pointing to its consumers is also addressed.
This paper is organized as follows.The model of spatial duopoly with advertisement is established in the next section.The model is analyzed in Section 3. The equilibrium price and the equilibrium output are all outlined and discussed.Furthermore, the relationships between transportation costs and advertisement investment are considered in this section.Some remarks are given and some further research is discussed in the final section.

Model
The advertisement model under spatial duopoly is formally established here.Consumers are uniformly distributed in the linear city:  ∈ [0, 1].Two producers in the linear city with locations  1 = 0 and  2 = 1, producing products with quality differentiation, are introduced in this industry.
Consumers.Transportation costs are fully undertaken by consumers.Based on the prices  1 and  2 along with locations  1 = 0 and  2 = 1, the utility of consumer in  buying quantity   from firm  is where  > 0 represents the transportation cost for a unit product and (,   ) denotes the distance between the firm  and this consumer, for  = 1, 2.  is assumed to be large enough such that the market is fully covered.The variable  heavily depends on transport technologies and other factors, such as management.The distance may be geographic, related to differences in beliefs, cultures, and so on.In some papers, Larralde et al. [14] used quadratic transportation costs.In general, the distance function (,   ) is convex.In this paper, we always use the distance function The consumer in  is inclined to buying the product of the first producer if and only if the following inequality holds: Otherwise, this consumer is likely to buy the second producer's product.We assume that marginal transportation costs are identical for the two firms, while Armstrong and Vickers (2009) employed the different marginal transportation costs.
The demand based on (2) is outlined.The solution of the following equation is denoted by  * : The explicit solution to (3) is The demand is given as follows: According to (5), advertisement has strong externality.When there are many firms, free-riders may exist.
Firms.The constant marginal costs incurred by the two firms are all  0 .Given price  1 , brand value  1 > 0, advertisement investment  1 , and quantity  1 , the first firm's net profit is outlined by the following: 2 1 denotes the advertisement costs of the first firm.The first firm maximizes the above profit function by selecting price  1 and advertisement investment  1 .
Similarly,  2 2 denotes the advertisement costs of the second firm.Given price  2 , brand value  2 > 0, advertisement investment  2 , and quantity  2 , the second firm maximizes the following profit function: The second firm maximizes the above profit function by adjusting price and advertisement investment.
In this paper, we always consider the linear city, and the corresponding conclusions can be extended to the Hotelling model with multiple dimensions.Furthermore, the distance function (,  1 ) = | −  1 | is employed, and it can be extended to general cases.The linear transportation cost, which can be easily extended, is utilized to simplify the model.

Main Results
The above model is considered in this section.We first consider demand in the spatial duopoly and then the equilibrium.

Equilibrium.
Based on market clearing conditions, the profits of two firms are given as follows where  1 ≥ 0 and  2 ≥ 0. If the equilibrium is strictly interior, the first order optimal conditions of (8) are The equilibrium is determined by ( 9)- (12).Firstly, the existence of ( 6) and ( 7) is addressed.By second order differentiations, we have the following.
Remark 2. Lemma 1 indicates the existence and uniqueness of the above model.

Proposition 3. Bigger brand yields both higher price and more advertisement investment of the corresponding firms. Bigger brand causes rival's both less advertisement investment and lower price.
Remark 4. A firm with bigger brand owns more market power, which reduces the competition in this industry.Equation (10) yields = .This is summarized as follows.
Proposition 5. Advertisement investment is increased in transportation costs for firms sharing less market size and decreased in transportation costs for firms sharing more market size.Remark 6.Transportation costs reduce the competitions of advertisement.Actually, transportation costs have deterring effects on firm's competition and these deterring effects cause the above conclusion.
By envelop theorem, for profit functions, we further have   /  > 0 and   /  < 0, for ,  = 1, 2 and  ̸ = .Proposition 7. A firm benefits from its brand.Improved brand value damages rival's benefits.Remark 8.By brand promotion, firms improve market share and earn more profits.Brand maintains the monopolistic power and damages rival's profits.
We further discuss the first order optimal conditions.For  = 1, 2, we further define price elasticity of demand and advertisement elasticity of demand at the equilibrium as follows: Equations ( 9), ( 10), (13), and (15) jointly yield Equations ( 11), ( 12), ( 14), and (16) manifest Equations ( 17) and ( 18) mean that the proportion of sales revenue spending on advertisement is determined by a simple elasticity ratio under equilibrium.Proposition 9.The proportion of sales revenue spending on advertisement is half of a simple elasticity ratio under equilibrium.
Remark 10.This interesting conclusion is consistent with advertisement investment, such as that of Bagwell [10].Because of the quadratic cost function of advertisement, compared with that of Bagwell [10], there is a constant 1/2.
Proposition 11.A firm with little market size has intention of free-riding in advertisement.