Age, Biography and Wiki

Luc-Normand Tellier was born on 10 October, 1944 in Montreal, Quebec, Canada. Discover Luc-Normand Tellier's Biography, Age, Height, Physical Stats, Dating/Affairs, Family and career updates. Learn How rich is He in this year and how He spends money? Also learn how He earned most of networth at the age of 79 years old?

Popular As N/A
Occupation N/A
Age 80 years old
Zodiac Sign Libra
Born 10 October 1944
Birthday 10 October
Birthplace Montreal, Quebec, Canada
Nationality Canada

We recommend you to check the complete list of Famous People born on 10 October. He is a member of famous with the age 80 years old group.

Luc-Normand Tellier Height, Weight & Measurements

At 80 years old, Luc-Normand Tellier height not available right now. We will update Luc-Normand Tellier's Height, weight, Body Measurements, Eye Color, Hair Color, Shoe & Dress size soon as possible.

Physical Status
Height Not Available
Weight Not Available
Body Measurements Not Available
Eye Color Not Available
Hair Color Not Available

Dating & Relationship status

He is currently single. He is not dating anyone. We don't have much information about He's past relationship and any previous engaged. According to our Database, He has no children.

Family
Parents Not Available
Wife Not Available
Sibling Not Available
Children Not Available

Luc-Normand Tellier Net Worth

His net worth has been growing significantly in 2022-2023. So, how much is Luc-Normand Tellier worth at the age of 80 years old? Luc-Normand Tellier’s income source is mostly from being a successful . He is from Canada. We have estimated Luc-Normand Tellier's net worth , money, salary, income, and assets.

Net Worth in 2023 $1 Million - $5 Million
Salary in 2023 Under Review
Net Worth in 2022 Pending
Salary in 2022 Under Review
House Not Available
Cars Not Available
Source of Income

Luc-Normand Tellier Social Network

Instagram
Linkedin
Twitter
Facebook
Wikipedia
Imdb

Timeline

2017

In 2017-2018, he elaborated and implemented an Urban Metric System based on the notions of attractive force, repulsive force, and vector field analysis. That method allows to mathematically delimit the boundaries of urban areas (central cities, agglomerations, metropolitan areas, megacities, megalopolises, etc.) on the unique basis of the spatial distribution of dwellers and workers.

2005

In 2005 (in French) and 2009 (in English), Tellier published a book that reinterpreted the urban world history in the light of the topodynamic theory he had previously developed.

1996

In his first book, whose title was "Le Québec, État nordique", Tellier proposed a rapprochement between Canada, Denmark, Finland, Iceland, Norway, Sweden, and, eventually, an independent Quebec. That was 19 years before the Ottawa Declaration of 1996, and the creation of the Arctic Council, which gathers together those countries, plus Russia and the United States.

1995

In 1995, Tellier wrote a paper with Claude Vertefeuille introducing the concept of topodynamic inertia, and laying a mathematical basis for that concept. That paper launched a debate that led to refining the concept, and greatly consolidating its mathematical basis. This was done in cooperation with Martin Pinsonnault. In 1997, Tellier published another paper that introduced the concept of topodynamic corridors, and the idea of a new section of economic sciences intended to complete microeconomics, meso-economics and macroeconomics. That new section, called "anoeconomics", would study the space-economic phenomena that are observed at a larger scale than the one of the States (which is the scale of macroeconomics) in a very long-run perspective. "Anoeconomics" comes from ano in Ancient Greek, which means "going back through time, and going up through space" (as in the word "anode").

1989

In 1989, Tellier resorted to the attraction-repulsion problem to elaborate a new type of demo-economic model, the topodynamic model, which is not econometric, and which was developed before the emergence of the New Economic Geography. The topodynamic model was conceived with respect to a continuous space, and it allows generating long-run demo-economic projections in regions where other demo-economic models cannot generate believable projections due to the lack of reliable data.

1987

Parallel to his works in spatial economics, Tellier published in 1987 a book about the Le Tellier clan, which was one of the two main clans that struggled for obtaining the favors of the king of France at Versailles during the 17th and 18th centuries. It is in this clan that economic liberalism was born in reaction to "colbertism", which was the economic philosophy of the opposite clan.

1985

In 1985, in a book entitled Économie spatiale: rationalité économique de l'espace habité, Tellier formulated an all-new problem called the "attraction-repulsion problem", which constitutes a generalization of both the Fermat and Weber problems. In the same book, he solved that problem for the first time in the triangle case, and he reinterpreted the space economy theory, especially, the theory of land rent, in the light of the concepts of attractive and repulsive forces stemming from the attraction-repulsion problem. That problem was later further analyzed by mathematicians like Chen, Hansen, Jaumard and Tuy (1992), and Jalal and Krarup (2003). Moreover, the attraction-repulsion problem is seen by Ottaviano and Thisse (2005) as a prelude to the New Economic Geography that developed in the 1990s, and earned Paul Krugman a Nobel Memorial Prize in Economic Sciences in 2008. In its simplest version, the attraction-repulsion problem consists in locating a point D with respect to three points A1, A2 and R in such a way that the attractive forces exerted by points A1 and A2, and the repulsive force exerted by point R cancel each other out.

1971

In 1971, he found the first direct (non iterative) numerical solution of the Fermat and Weber triangle problems. Identified long before Von Thünen’s contributions, which go back to 1818, the Fermat triangle problem can be seen as the very beginning of space economy. It was formulated by the famous French mathematician Pierre de Fermat before 1640. More than 330 years later, it still had no direct numerical solution. As for the Weber triangle problem, which is a generalization of the Fermat triangle problem, it was first formulated by Thomas Simpson in 1750, and popularized by Alfred Weber in 1909. In 1971, that problem still had no direct numerical solution. The Fermat triangle problem consists in locating a point D with respect to three points A, B, and C in such a way that the sum of the distances between D and each of the three other points is minimized. The Weber triangle problem consists in locating a point D with respect to three points A, B, and C in such a way that the sum of the transportation costs between D and each of the three other points is minimized.

1964

After teaching for two years (1964–1966) at the Collège Saint-André of Kigali, Rwanda, as a Canadian Peace Corps (CUSO/SUCO) volunteer, Tellier studied both economics and city planning. He obtained a bachelor's degree in Economics (1968) and a master's degree in City planning (1971) from the University of Montreal, as well as a master's degree (1971) and a Ph.D. (1973) in Regional science from the "Ivy League" University of Pennsylvania. Later, he taught urban economics at the "Institut d’urbanisme" of the University of Montreal before founding, in 1976, the Department of Urban Studies and Tourism of the University of Quebec at Montreal. He was chairman of that department for 13 years as well as, from 1981 to 1983, the director of the "Urbanisation" research center of the Institut National de la Recherche Scientifique (INRS). He was granted the title of "Professor Emeritus" of the University of Quebec at Montréal in 2012.

1944

Luc-Normand Tellier (born October 10, 1944) is a Professor Emeritus in spatial economics of the University of Quebec at Montreal.