The fundamental theorem of design economics
The fundamental theorem of design economics
0 min read
Rate this book:
About This Book
Every artifact has a design, and thus designs are an important class of information goods. In this paper, we establish the scope of the design valuation methodology based on real options, which we developed in Design Rules, Volume 1, The Power of Modularity (MIT Press, 2000). We argue that if an economic process is: ex ante uncertain; ex post rankable by outcome; ex post contingent; costly; and has non-exclusive outputs; and if better outcomes have higher financial value (are worth more money), then the value of that process will embed either simple real options (if the process is indivisible) or compound real options (if the process is modular). The real options, in turn, will have a "Q(k)-type structure," where Q(k) represents the expectation of the maximum of the outcomes of k processes run in parallel. We note that Q(k) is both an order statistic function and a real option function. All design processes are ex ante uncertain; costly; and have non-exclusive outputs. Virtually all designs are ex postrankable by outcome within an appropriate functional category. Finally, many designs can be made ex post contingent by separating the design process from the production process for the artifact in question. Hence the fundamental theorem applies to a large subset of an important class of information goods.
Buy This Book
As an Amazon Associate and Bookshop.org affiliate, BookOrb earns from qualifying purchases.
Write a Review
Sign in to write a review.
More by Carliss Y. Baldwin
All modules are not created eq
All modules are not created equal
Architectural innovation and d
Architectural innovation and dynamic competition
Asset heterogeneity and failin
Asset heterogeneity and failing institutions
Bottlenecks, modules and dynam
Bottlenecks, modules and dynamic architectural capabilities
Competition among hidden modul
Competition among hidden modules and industry evolution
Competition in modular cluster
Competition in modular clusters